AbstractA geometry structure on a category is defined in analogy with the structure of geometric lattice on a set. This definition includes that of geometric lattice. The elementary properties of projective space are developed in this setting, and the correspondence of the elements in a geometric lattice to closed sets in a topology is explored
Abstract. We present a beautiful interplay between combinatorial topology and homological algebra fo...
AbstractThe classical approach to maps is by cell decomposition of a surface. A combinatorial map is...
AbstractIn the course of research into the calculus of variations, a new numerical topological invar...
AbstractA geometry structure on a category is defined in analogy with the structure of geometric lat...
AbstractGiven a combinatorial geometry (or “matroid”) M, defined on a finite set E, a certain abelia...
AbstractThe classical approach to maps, as surveyed by Coxeter and Moser (“Generators and Relations ...
AbstractPrevious work has recast the invariant theory of projective geometry in terms of first order...
AbstractLet G be an n-dimensional geometric lattice with a topology. Assume that each level set Gj o...
AbstractWe introduce a structure of combinatorial geometry on the setχ(K)of orders of an orderable f...
AbstractThe topological geometrical categories form a special class of topological categories over S...
Copyright © 2013 David G. Glynn. This is an open access article distributed under the Creative Com...
This chapter discusses the bouquets of geometric lattices. Matroid theory is in the center of Combin...
This work.develops the foundations of topological graph theory with a unified approach using combin...
Many combinatorial (topological) models have been proposed in geometric modeling, computational geom...
The classical approach to maps, as surveyed by Coxeter and Moser in Generators and Relations for Dis...
Abstract. We present a beautiful interplay between combinatorial topology and homological algebra fo...
AbstractThe classical approach to maps is by cell decomposition of a surface. A combinatorial map is...
AbstractIn the course of research into the calculus of variations, a new numerical topological invar...
AbstractA geometry structure on a category is defined in analogy with the structure of geometric lat...
AbstractGiven a combinatorial geometry (or “matroid”) M, defined on a finite set E, a certain abelia...
AbstractThe classical approach to maps, as surveyed by Coxeter and Moser (“Generators and Relations ...
AbstractPrevious work has recast the invariant theory of projective geometry in terms of first order...
AbstractLet G be an n-dimensional geometric lattice with a topology. Assume that each level set Gj o...
AbstractWe introduce a structure of combinatorial geometry on the setχ(K)of orders of an orderable f...
AbstractThe topological geometrical categories form a special class of topological categories over S...
Copyright © 2013 David G. Glynn. This is an open access article distributed under the Creative Com...
This chapter discusses the bouquets of geometric lattices. Matroid theory is in the center of Combin...
This work.develops the foundations of topological graph theory with a unified approach using combin...
Many combinatorial (topological) models have been proposed in geometric modeling, computational geom...
The classical approach to maps, as surveyed by Coxeter and Moser in Generators and Relations for Dis...
Abstract. We present a beautiful interplay between combinatorial topology and homological algebra fo...
AbstractThe classical approach to maps is by cell decomposition of a surface. A combinatorial map is...
AbstractIn the course of research into the calculus of variations, a new numerical topological invar...
DOI
Add to ORKG